Answer:
i think so
Step-by-step explanation:
To convert 8% to an equivalent fraction, divide 8 by 100. Simplify the fraction obtained to find the equivalent fraction.
To find the equivalent fraction to 8%, we need to convert the percentage to a fraction with a denominator of 100. Since 8% is 8 out of 100 parts, the equivalent fraction is 8/100. We can simplify this fraction by dividing both the numerator and denominator by their greatest common factor, which in this case is 4. Simplifying 8/100 gives us the equivalent fraction of 2/25. Therefore, the correct answer is 2/25.
This question is about converting a percentage to a fraction. When you want to convert a percentage into a fraction, you put the percentage over 100 and reduce the fraction if necessary. So, 8% as a fraction is 8/100. To simplify the fraction, find the greatest common divisor of the numerator and denominator, which is 4 in this case. Divide both the numerator and denominator by 4, and you get the fraction 2/25. Therefore, the fraction that is equivalent to 8% is 2/25.
#SPJ11
Answer:6760
Step-by-step explanation:
there are 26 letters in the alphabet to choose from so you do 26x26 since your using 2 letters. Then you use 10 for numbers so 10x26x26=6760
(I did this in class, and my teacher went over the answer)
°° Let's see -
Basically, you divide the number of miles Chad drove by the number of hours it took. Then, it gives you the number of miles Chad drove in one hour. Let's try it!
168 ÷ 3 = 56
You can now see that Chad drove 56 miles in one hour.
↑ ↑ ↑ Hope this helps! :D
Answer:
JK = 83 , m∠A = 70° , m∠ALM = 110°
Step-by-step explanation:
* Lets explain how to solve the problem
∵ ABCD is a trapezoid
∴ DC // AB
∴ m∠D + m∠A = 180° ⇒ interior supplementary angles
∵ m∠D = 110°
∴ 110° + m∠A = 180° ⇒ subtract 110° from both sides
∴ m∠A = 70°
∵ L is the midpoint of AD, and M is the midpoint of BC
∴ LM is the median of trapezoid ABCD
∴ LM // AB and DC
∴ m∠D = m∠ALM ⇒ corresponding angles
∵ m∠D = 110°
∴ m∠ ALM = 110°
- The length of the median is half the sum of the lengths of the two
parallel bases
∴ LM = 1/2 (AB + DC)
∵ AB = 96 units and DC = 44 units
∴ LM = 1/2 (96 + 44) = 1/2 (140) = 70 units
- In the quadrilateral ABML
∵ AB // LM
∵ AL ≠ BM
∴ ABML is a trapezoid
∵ JK is its median
∴ JK = 1/2 (AB + LM)
∵ AB = 96 units ⇒ given
∵ LM = 70 units ⇒ proved
∴ JK = 1/2 (96 + 70) = 1/2 (166) = 83
∴ JK = 83 units